Interpolation in spaces of harmonic functions with asymptotic expansions (Q1174589)

Let \(D\) be a disc in the complex plane, with 0 in its boundary. The author shows that for any arbitrarily chosen harmonic asymptotic expansion at 0 of the form \[ a_{0,0}+\sum[a_ m\hbox{Re}(z^ m)+b_ m\hbox{Im}(z^ m)] \] there is a function \(f\) harmonic on \(D\) and continuous up to the boundary, which has the given data as its asymptotic expansion at 0.